Let arg(z) represent the principal argument of the complex number z. Then $| z | = 3$ and art(z – 1) – arg(z + 1) = $\frac{π}{4}$ intersect

Option 1 - Exactly at one point

Option 2 - Exactly at two points

Option 3 - Nowhere

Option 4 - At infinitely many points.

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Vishal Baghel | Contributor-Level 10

4 months ago

Correct Option - 3

Detailed Solution:

$| z | = 3 \Rightarrow$ circle with radius = 3

arg $(\frac{z - 1}{z + 1}) = \frac{π}{4},$ $\frac{}{} \frac{}{}$ part of a circle (with radius $\sqrt[]{2}$ ). no common points

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$z_{1}^{3} + z_{2}^{3} = 125 - 3 z_{1} \cdot z_{2} (5)$

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a = 1 > 0 and D < 0

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Let arg(z) represent the principal argument of the complex number z. Then | z | = 3 and art(z – 1) – arg(z + 1) = π 4 intersect

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Let arg(z) represent the principal argument of the complex number z. Then $| z | = 3$ and art(z – 1) – arg(z + 1) = $\frac{π}{4}$ intersect